Journal title
Geometric and Functional Analysis
DOI
10.1007/s00039-026-00731-7
Last updated
2026-02-04T10:00:08.17+00:00
Abstract
<jats:title>Abstract</jats:title>
<jats:p>We prove that the Dehn function of every finitely presented Bestvina–Brady group grows as a linear, quadratic, cubic, or quartic polynomial. In fact, we provide explicit criteria on the defining graph to determine the degree of this polynomial. As a consequence, we identify an obstruction that prevents certain Bestvina–Brady groups from admitting a CAT(0) structure.</jats:p>
<jats:p>We prove that the Dehn function of every finitely presented Bestvina–Brady group grows as a linear, quadratic, cubic, or quartic polynomial. In fact, we provide explicit criteria on the defining graph to determine the degree of this polynomial. As a consequence, we identify an obstruction that prevents certain Bestvina–Brady groups from admitting a CAT(0) structure.</jats:p>
Symplectic ID
2366917
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Publication date
02 Feb 2026